AKCE International Journal of Graphs and Combinatorics (Aug 2019)
Note on edge irregular reflexive labelings of graphs
Abstract
For a graph G, an edge labeling fe:E(G)→{1,2,…,ke}and a vertex labeling fv:V(G)→{0,2,4,…,2kv}are called total k-labeling, where k=max{ke,2kv}. The total k-labeling is called an edge irregular reflexive k-labeling of the graph G, if for every two different edges xy and x′y′of G, one has wt(xy)=fv(x)+fe(xy)+fv(y)≠wt(x′y′)=fv(x′)+fe(x′y′)+fv(y′).The minimum k for which the graph G has an edge irregular reflexive k-labeling is called the reflexive edge strength of G.In this paper we determine the exact value of the reflexive edge strength for cycles, Cartesian product of two cycles and for join graphs of the path and cycle with 2K2. Keywords: Edge irregular reflexive labeling, Reflexive edge strength, Cycles, Cartesian product of cycles
